Abstract
We study on which classes of graphs first-order logic (FO) and monadic second-order logic (MSO) have the same expressive power. We show that for all classes C of graphs that are closed under taking subgraphs, FO and MSO have the same expressive power on C if and only if, C has bounded tree depth. Tree depth is a graph invariant that measures the similarity of a graph to a star in a similar way that tree width measures the similarity of a graph to a tree. For classes just closed under taking induced subgraphs, we show an analogous result for guarded second-order logic (GSO), the variant of MSO that not only allows quantification over vertex sets but also over edge sets. A key tool in our proof is a Feferman-Vaught-type theorem that works for infinite collections of structures despite being constructive.
Original language | English |
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Article number | 25 |
Journal | ACM Transactions on Computational Logic |
Volume | 17 |
Issue number | 4 |
ISSN | 1529-3785 |
DOIs | |
Publication status | Published - 11.2016 |